Simple shear Simple shear is a deformation in which parallel planes in a material remain parallel and maintain a constant distance, while translating relative to each other.In fluid mechanics , simple shear is a special case of deformation where only one component of velocity vectors has a non-zero value:gradient of velocity is constant and perpendicular to the velocity itself:shear rate and:tensor Γ for this deformation has only one nonzero term:pure shear strain with the rate of and rotation with the rate of :mathematical model representing simple shear is a shear mapping restricted to the physical limits. It is an elementary linear transformation represented by a matrix . The model may represent laminar flow velocity at varying depths of a long channel with constant cross-section. Limited shear deformation is also used in vibration control , for instance base isolation of buildings for limiting earthquake damage.In solid mechanics, a simple shear deformation is defined as an isochoric plane deformation in which there are a set of line elements with a given reference orientation that do not change length and orientation during the deformation. This deformation is differentiated from a pure shear by virtue of the presence of a rigid rotation of the material . When rubber deforms under simple shear, its stress-strain behavior is approximately linear. A rod under torsion is a practical example for a body under simple shear.e 1 is the fixed reference orientation in which line elements do not deform during the deformation and e 1 − e 2 is the plane of deformation, then the deformation gradient in simple shear can be expressed aswrite the deformation gradient asSimple shear stress–strain relation In linear elasticity , shear stress , denoted, is related to shear strain , denoted, by the following equation:shear modulus of the material, given byYoung's modulus and is Poisson's ratio . Combining gives
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